Small entropy doubling for random walks and polynomial growth

Abstract

Gromov's theorem states that a finitely generated group has polynomial growth if and only if it is virtually nilpotent. A key ingredient in its proof is the small doubling property. In this work, we study entropy analogues of this property for random walks on groups. We show that if a finitely supported symmetric random walk Rn satisfies \[ H(R2n) H(Rn) + K \] at some sufficiently large scale n, then the underlying group is virtually nilpotent, with bounds depending on K and μ. Our approach adapts Tao's entropy Balog--Szemer\'edi--Gowers argument to unimodular locally compact groups, combined with structural results on approximate groups. As applications, we obtain entropy-based criteria for polynomial growth. We also deduce an entropy gap phenomenon: if G is not virtually nilpotent, then the entropy of random walks on G grows faster than a universal superlogarithmic function.